On two four-dimensional curl operators and their applications
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Bulletin of the Karaganda University
Abstract
Academician O.A. Ladyzhenskaya emphasized the importance of constructing a fundamental system in the
space of solenoidal functions for simple domains such as squares, cubes, and similar regions. This article
examines the problem of constructing such fundamental systems for a four-dimensional parallelepiped and
cube. As is well known, applying the stream functions known from the two- and three-dimensional cases,
the spectral problem for the Stokes operator reduces to the so-called clamped plate problem, which, in
turn, has no solution in domains such as the square, cube, or parallelepiped. Thus, in higher-dimensional
cases, the necessity of an analogous stream function becomes evident. In this work, the authors propose
two curl operators that satisfy the above-mentioned requirements. Using the introduced curl operators, the
spectral problem for the biharmonic operator in a four-dimensional parallelepiped and cube is formulated.
Alternative approaches to constructing a fundamental system are presented, given the unsolvability of the
spectral problem. Furthermore, the growth orders of the obtained eigenvalues are established.
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Jenaliyev M.T.On two four-dimensional curl operators and their applications M.T. Jenaliyev, A.S. Kassymbekova, M.G. Yergaliyev//Bulletin of the Karaganda University. Mathematics series . – 2025. – № 2(118). – pp. 106-121